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Back-Projection Based Fidelity Term for Ill-Posed Linear Inverse Problems

Tom Tirer, Raja Giryes

2020IEEE Transactions on Image Processing48 citationsDOIOpen Access PDF

Abstract

Ill-posed linear inverse problems appear in many image processing applications, such as deblurring, superresolution and compressed sensing. Many restoration strategies involve minimizing a cost function, which is composed of fidelity and prior terms, balanced by a regularization parameter. While a vast amount of research has been focused on different prior models, the fidelity term is almost always chosen to be the least squares (LS) objective, that encourages fitting the linearly transformed optimization variable to the observations. In this paper, we examine a different fidelity term, which has been implicitly used by the recently proposed iterative denoising and backward projections (IDBP) framework. This term encourages agreement between the projection of the optimization variable onto the row space of the linear operator and the pseudoinverse of the linear operator ("back-projection") applied on the observations. We analytically examine the difference between the two fidelity terms for Tikhonov regularization and identify cases (such as a badly conditioned linear operator) where the new term has an advantage over the standard LS one. Moreover, we demonstrate empirically that the behavior of the two induced cost functions for sophisticated convex and non-convex priors, such as total-variation, BM3D, and deep generative models, correlates with the obtained theoretical analysis.

Topics & Concepts

FidelityRegularization (linguistics)Tikhonov regularizationInverse problemMathematicsMoore–Penrose pseudoinverseAlgorithmMathematical optimizationConvex optimizationOperator (biology)Iterative methodTerm (time)Convex functionProximal gradient methods for learningLinear mapImage restorationLeast-squares function approximationOptimization problemLinear systemLinear programmingImage processingSubgradient methodIterative reconstructionComputer scienceNoise reductionInverseProjection (relational algebra)Linear modelVariable (mathematics)Applied mathematicsArtificial intelligenceConvexityRank (graph theory)Iteratively reweighted least squaresLinear operatorsRegular polygonMinificationLinear least squaresBayesian probabilityHadamard transformSparse and Compressive Sensing TechniquesNumerical methods in inverse problemsImage and Signal Denoising Methods
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